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Jul 16, 1983 - Studies of Some Cheletropic Reactions. Michael J. S. Dewar* and Lek Chantranupong2. Contribution from the Department of Chemistry, The ...
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7152

J . Am. Chem. Soc. 1983, 105, 7152-7161

correspond to an angular fluctuation of the phosphate of at least *30°. This estimate is based on the minimum angular fluctuation required about the u22tensor axis, to provide the observed degree of averaging. If the axis of the fluctuation is not the uZ2axis, then the size of the fluctuation must be even larger. Since the features of the powder spectrum are not severely broadened as water is added, the motion must always be in the fast exchange limit, at a minimum frequency of ca. 10 kHz, and increasing in amplitude with additional water. The spectrum at 20 waters per nucleotide corresponds closely with that obtained for B-form DNA prepared by vapor-phase equilibration. The motions at this point may correspond to the approximately nanosecond time scale processes that are observed in solution and are attributed variously to strictly loca1314and a superposition of local and collective* motions. The line shape that occurs is consistent with a twisting motion about the long axis of the helix, assuming that u22is near the helix axis, expected from model compound studies. The angular fluctuation derived from the powder line shape is larger than that for the torsional modes derived from fluorescence measurements in solution. However, the N M R measurement is sensitive to slower motions than the optical measurements, and hence the amplitude will be larger if slow motions are present and their contribution is included in the total amplitude. Upon further addition of water, the averaging becomes even more drastic, with an essentially isotropically averaged line occurring by 33 waters per nucleotide. The relaxation behavior does not change significantly over this range, which indicates that the new motion is too slow to be efficient for relaxation, bracketing it to be in the range greater than ca. 10 kHz but less than 10 MHz. This motion is equivalent in effect to (and probably is the same as) the motion observed in B-form DNA upon raising the temperature. Opella et al.’ did

not observe averaging of the deuterium quadrupole coupling tensor of a base-attached hydrogen in the same sample for which the 31Ptensor averaging was observed. However, in a recent reporti9 Valeutine and Opella concluded from partially averaged 15N spectra that backbone motions also appear at the level of hydration of 5 water molecules per nucleotide. These motions must be internal since at this low level of hydration, tumbling of the DNA in the solvent would be extremely unlikely. The discrepancy between their 2Hand I5N results remains unexplained, but given the low sensitivity of 2H and the broad spectra observed, the initial partial averaging of the 2H tensor could have been obscured by quadrupolar effects. It is clear from the findings reported here that hydration is essential to permit the type of internal motions in DNA which can be detected by N M R and that the amplitude of such motions increases with an increasing degree of hydration. From the present work we have shown that several different kinds of motion occur in DNA at various levels of hydration. The measurements are thus far limited to j l P and hence probe only the backbone of the DNA. Further measurements will be made on defined-sequence DNA with labels incorporated in various sites to further define the nature of these motions. Acknowledgment. We thank Dr. M. Hogan for preparing the DNA used in these studies and for many helpful discussions on DNA dynamics. This research is funded by Grant GP23633, National Science Foundation Grant PCM 80-2 1899, and National Institutes of Health Grant RR00711.

(19) Valeutine, K.; Opella, S. J. In “Conversation in Biomolecular Stereodynamics”; Sarma, R. H., Ed.; Abstracts No. 17, p 42, 1983.

Ground States of Molecules. 62.’ MIND0/3 and MNDO Studies of Some Cheletropic Reactions Michael J. S. Dewar* and Lek Chantranupong2 Contribution from the Department of Chemistry, The University of Texas at Austin, Austin, Texas 78712. Receiued December 16, 1982. Revised Manuscript Received July 16, I983

Abstract: MNDO and MIND0/3 calculations are reported for the reverse cheletropic eliminations of nitrogen from N-(3pyrroliny1)nitrene and of carbon monoxide from 4-cyclopentenone and from tricyclo[5.2.1.02s6]deca-3,8-diene-5, 10-dione, and the reverse Diels-Alder elimination of nitrogen from 3,6-dihydropyridazine. All these reactions are predicted to take place via very unsymmetrical transition states in which one of the breaking bonds is almost intact, leading to biradical-like species which then dissociate.

Introduction While the mechanisms of cheletropic reactions3 have been extensively d i s c u ~ s e din~ ~terms ~ of qualitative M O theory, no adequate quantitative calculations for such reactions seem as yet to have been published. In order to be of any real chemical value in such connections, the calculations must not only be carried out by a procedure of adequate accuracy and reliability, but also with full geometry optimization, using a derivative optimization method and without making any assumptions.6 Transition states must also be characterized by the McIver-Komornicki’ procedure of (1) For Part 60 in this series, see: Dewar, M. J. S.; Nelson, D. J. J . A m . Chem. SOC.,accepted for publication. (2) Robert A. Welch Predoctoral Fellow. (3) Woodward, R. B.; Hoffmann, R. “The Conservation of Orbital Symmetry”; Academic Press: New York, 1972. (4) Dewar, M. J. S . Angew. Chem. 1971,83, 859; Angew. Chem., Inr. E d . Engl. 1971, 10, 761. (5) Dewar, M. J. S.; Dougherty, R. C. ”The PMO Theory of Organic Chemistry”; Plenum Press: New York, 1975,

0002-7863/83/1505-7152$01.50/0

calculating force constants and transition vectors. These requirements make calculations by adequate ab initio procedures prohibitively expensive for any but the simplest organic molecules.* Meaningful calculations for the larger systems of direct interest to organic chemists can therefore be carried out at present only by some semiempirical procedure, and the only ones with any real claim to adequate accuracy currently available are the parametric methods developed by our group, Le., MIND0/39 and MNDO.’O (6) Any assumptions concerning the geometry of the TS must be based on an assumed mechanism for the reaction. Any calculation making such assumptions will then tend to reproduce the assumed mechanism, right or wrong. (7) Mclver, J. W., Jr.; Komornicki, A. J. Am. Chem. SOC.1972, 94, 2625; Chem. Phys. Lett. 1971, 10, 303. (8) In order to obtain acceptable results, it is necessary to use a large basis set (of at least double-r quality) and to allow for electron correlation either by very extensive CI or some comparable procedure. See, e.g.: Komornicki, A,; Goddard, J. D.; Schaefer, H. F., 111 J . Am. Chem. SOC.1980, 102, 1763. (9) Bingham, R. C.; Dewar, M. J. S.; Lo, D. H. J. A m . Chem. SOC.1975, 97, 1285, 1294, 1302. (10) Dewar, M. J. S.;Thiel, W. J . Am. Chem. SOC.1977, 99, 4899,4907.

0 1983 American Chemical Society

J . Am. Chem. Soc., Vol. 105, No. 24, 1983 7153

MNDO Studies of Some Cheletropic Reactions Comparative tests]’ have shown that the results they give are, in general, comparable with those from rather good ab initio calculations and far superior to ones using small basis sets (e.g., STO-3G). Since the cost of calculations by our procedures is less by at least three orders of magnitude than that by any comparable ab initio method, they can be applied to quite large molecules, using computers that are generally available. No current procedure can be relied on a priori, all of them being essentially empirical so far as chemical applications are concerned. The results can be trusted only insofar as the method has been tested, by comparisons with experiment. M I N D 0 / 3 and MNDO have the advantage of having been tested more thoroughly than any other procedure, parametric or ab initio, so it is usually possible to foretell their performance in any given connection. We therefore decided to use them in a survey of cheletropic reactions. Here we report results for some simple reverse cheletropic reactions involving loss of N 2 or CO from partly conjugated rings.

Table I. Calculated Properties of 3-Pyrroline

bond lengths (A)

NlC2 2‘3‘

c3 c4

N,N, c 2

formal charge

(e)

H

C3H N,

c* c3

N6 H, H3

AH, (kcal/mol) I, ( e V 1-1 (D)

symmetry

MIND0/3

MNDO

1.504 1.493 1.344 1.161 1.123 1.101 0.366 0.004 -0 .OO 24 -0.324 -0.010 -0.010 52.1 7.85 2.75

1.524 1.508 1.348 1.200 1.1 13 1.084 -0.029 0.099 -0.110 -0.282 0.040

c 2u

0.085 17.5 8.75 3.88 c 2u

Procedure The calculations were carried out using the standard M I N D 0 / 3 9 and MNDO’O methods and parameters. Calculations for biradical-like, or potentially biradical-like, species were also carried out using the analogous spin-unrestricted treatments, UMIND0/312 and U M N D O . ” Geometries were found by minimizing the energy with respect to all geometrical variables, no assumptions being made other than that of appropriate symmetry in deliberate calculations of symmetric structures. The minimizations were carried out by the Davidon-Fletcher-Po~eIl~~ method, incorporated in our MOPAC computer programs.lS Transition states were located approximately by the reaction coordinate method,I6 then refined by minimizing the norm of the gradient of the energy,’ and characterized’ by calculating force constants and transition vectors, as indicated above.

Results and Discussion A. Conversion of N-(3-Pyrrolinyl)nih.ene(1) to Butadiene (2). The first reaction studied was the reverse cheletropic decomposition of N-(3-pyrrolinyl)nitrene (1) to form butadiene (2) and nitrogen.

1

2

While 1 itself is still unknown, saturated nitrenes are known to lose N 2 very readily, even below room temperature,” implying that the corresponding activation energies cannot be significantly greater than 20 kcal/mol. That for 1 is likely to be even less since it leads to a normal molecule rather than a biradical. Table I shows the bond lengths, heats of formation (AHf),first ionization energies ( I , ) , and dipole moments ( b ) calculated for 1 by M I N D 0 / 3 and MNDO. Both methods predict 1 to have C, symmetry, as expected, and the geometries predicted by both are similar. MIND0/3 gave a much more negative value for AHf, and a smaller one for b, than MNDO. Since these differences are probably due to the tendency of M I N D 0 / 3 to overestimate the stabilities of molecules containing adjacent heteroatoms: the MNDO values are more likely to be correct. The values for I , were calculated by using Koopmans’ theorem. Here again the MNDO value is preferable because this is an area where MNDO excels.lO%lsNo data are available for 1, or for any derivative of 1, for comparison with these predictions. Dewar, M. J. S.; Ford, G. P. J . Am. Chem. SOC.1979, 101, 5558. Bischof, P. J . Am. Chem. SOC.1976, 98, 6844. Dewar, M. J. S.; Olivella, S.; Rzepa, H. S . Chem. Phys. Lett. 1977, Dewar, M. J. S . ; Rzepa, H. S. J . Am. Chem. SOC.1978, 100, 784. See Fletcher, R.; Powell, M. J. D. Comput. J . 1963, 6, 163. (15) Available from QCPE. (16) The term ‘reaction wardinate” is used here in its original sense, Le., an arbitrary geometrical variable that changes during a reaction and is used to follow the progress of the reaction. Recent use of this term to describe the normal wordinate in the TS, Corresponding to the imaginary vibration, or the path of steepest descent from the TS, has caused unnecessary confusion. The former is much better described as the transition coordinate and the latter as the minimum energy reaction path (MERP). (17) Schultz, P. G.; Dervan, P. B. J . Am. Chem. SOC.1980, 102, 878.

Figure 1. Geometries calculated by M I N D 0 / 3 (MNDO) for the transition state for thermolysis of 1.

(2

The calculated and observed heats of formation of the products N,) are as follows:

+

M I N D 0 / 3 , 37.1; MNDO, 36.9; obsd,lg 26.0 kcal/mol

(2)

+

The heats of reaction (AH) for conversion of 1 to (2 N2) are then: M I N D 0 / 3 , -15.0; MNDO, -40.2 kcal/mol (3)

For reasons indicated above, the MNDO value is probably the better though in view of (2), even it may well be numerically too small by ca. 10 kcal/mol. The reaction is in any case extremely exothermic. The course of the reaction was then studied by M I N D 0 / 3 and MNDO, taking the length of one breaking CN bond as the reaction coordinate. In each case the reaction took place in a concerted20manner, via a very unsymmetrical transition state (TS), whose calculated geometries are given in Figure 1. The calculated activation energies (A,!?) were large (MIND0/3, 50.2; MNDO, 40.2 kcal/mol). We also studied the synchronous20 conversion of 1 to (2 N2) by enforcing C,symmetry. The corresponding values for the activation energy were even larger ( M I N D 0 / 3 , 55.4; MNDO, 43.4 kcal/mol), and the “transition states” were not even saddlepoints on the potential surfaces. Each of the corresponding Hessian (force constant) matrices had two negative

+

eigenvalue^.^ Even the true activation energies are, however, much too large, (18) See, e.g.: (a) Dewar, M. J. S.; McKee, M. L. J . Am. Chem. SOC. 1977,99,5231;Inorg. Chem. 1978.17, 1569; 1980,19,2662. (b) Dewar, M . J. S.;Ford, G. P.; Rzepa, H. S. Chem. Phys. Lett. 1977, 50, 262. (c) Dewar, M. J. S.;Rzepa, H. S . J . Am. Chem. SOC.1978,100,58. (d) Cowley, A. H.; Dewar, M. J. S.; Lattman, M.; Mills, J. L.; McKee, M. L. Zbid. 1978, 100, 3349. ( e ) David, D. E.; Dewar, M. J. S. Zbid. 1980, 102, 7387. (fj Dewar, M. J. S.;Cabelli, D. E.; Cowley, A. H. Ibid. 1981, 103, 3286, 3290. (19) Cox, J. D.; Pilcher, G. “Thermochemistry of Organic and Organometallic Compounds”; Academic Press: New York, 1970. (20) The terminology used here, which we strongly recommend, is as follows: (a) a concerted reaction is one which takes place in a single kinetic step; (b) a synchronous reaction is a concerted one where all the bond-forming and -breaking processes have taken place to similar extents in the TS; (c) a two-stage reaction is nonsynchronous but concerted, some of the changes in bonding taking place mainly between the reactants and TS, the rest between the TS products; (d) a two-step process is one taking place in two distinct kinetic steps, via a stable intermediate.

7154 J . Am. Chem. SOC.,Vol. 105, No. 24, 1983

Dewar and Chantranupong Table 11. Calculated Activation Parameters of 3,6-Dihydropyridazine AH*

AS*

method

(kcal mol”)

(eu)

log A

MNDO MIND0/3

47.14 36.93 36.7 k 0.5 36.3 ? 0.2 35.8 t 0.4

8.60 3.26

15.26 14.09 15.53 15.58 15.19

exptl

1.4

1.6

2.0

1.6

2.2

2.4

UMIND0/3 and UMNDO, very different results were obtained. Figure 2 shows projections of the potential surface, on the plane defined by the lengths of the breaking C N bonds as Cartesian coordinates, in the form of computer-drawn contour maps. Each point on each map corresponds to a geometry optimized with respect to the other variables. Here the reaction is predicted to be not only not synchronousz0 but not even concerted,30 taking place in steps20 via a biradical-like species (best represented by 5) as a stable intermediate. The geometries calculated for 5, and for the TS for its formation from 1, are indicated in Figure 3, which also shows some of their other calculated properties. The corresponding reaction profiles are shown in Figure 4. The rate-determining step in the overall conversion of 1 to (2 + N2) is the initial ring opening to 5, for which both procedures predict low activation energies (Table 11). While no kinetic data are

I

2

I

5

4

Figure 2. Contour maps representing projections of the potential energy surface for thermolysis of 1 in a plane defined by the lengths of the breaking CN bonds as coordinates: (a) MNDO, (b) MIND0/3. Contours (AH,) in kcal/mol.

given that 1,l-diazenes decompose rapidly below room temperature.I7 Similar problems arose in a recent M I N D 0 / 3 study2’ of the Diels-Alder reaction between 2 and ethylene and were found to be due to biradical character in the intermediates. In order to study such species, specific allowance must be made22for the strong correlation between the “unpaired” electrons, either by introduction of configuration interaction (CI), by the “halfelectron” (HE) method,23or by using a spin-unrestricted (UHF) treatment. Here we used the U H F versions of M I N D 0 / 3 (UMIND0/3) and MNDO (UMNDO) because they lead to variationally optimized wave functions. Derivatives of the energy can then be calculated very quickly, greatly reducing the time required for geometry optimizations and calculations of force constants. When the calculations for 1 ( 2 + N2)were repeated, using

-

(21) Dewar, M. J. S.; Olivella, S.; Rzepa, H. S. J . Am. Chem. SOC.1978, 100, 5650.

(22) Dewar, M. J. S.; Doubleday, C. E. J . Am. Chem. SOC.1978, 100, 4935. (23) (a) Dewar, M. J. S.; Hashmall, J. A,; Venier, C. G. J . Am. Chem. SOC.1968.90, 1953. (b) Dewar, M. J. S.; Olivella, S. J . Chem. SOC.,Faraday Trans. 2 1979, 75, 829.

7

8

6

9

available for any derivative of 3-pyrroline itself, the decomposition ,~~ of the dihydro derivative ( 6 ) of 3 has been s t ~ d i e d . ’ ~This presumably involves loss of Nz from 6 to give the biradical7 which then fragments to isobutene (8), the final product. If we are right in thinking that the rate-determining step in the decomposition of 1 involves breaking of a C N bond to form 5, rather than a synchronous breaking of both C N bonds, the same should also be the case for the less facile thermolysis of 6, the rate-determining step being again the formation of a biradical-like intermediate 9. If so, we might expect the decompositions of 1 and 6 to have similar entropies of activation and hence similar Arrhenius preexponential factors. The activation energy for 6 should, however, be somewhat larger than for 1 because the tertiary alkyl radical center in 9 should be less stabilized than the allyl one in 4.

The vibration frequencies of molecules can be calculated easily and effectively, using either MIND0/325or MND0.26 Using (24) See: (a) Dervan, P. B.; Uyehara, T. J . Am. Chem. SOC.1976, 98, 2003. (b) Hinsberg, W. D.; Dervan, P. B. Ibid. 1979, 101, 6142. (25) Dewar, M. J. S.; Ford, G. P. J . Am. Chem. SOC.1977, 99, 1685. (26) Dewar, M. J . S.; Ford, G. P.; McKee, M. L.; Rzepa, H. S.; Thiel, W.; Yamaguchi, Y. J . Mol. Struct. 1978, 43, 135.

J . Am. Chem. SOC.,Vol. 105, No. 24, 1983 7 1 5 5

MNDO Studies of Some Cheletropic Reactions

A 1.087

€/

AHf

=

6 2 . 3 9 kcalimole”

u

=

:.767 D

< 82

> =

AHf =

u

0.80

< 82,

96.06 kcalimole-I

=

2.594 D

=

0.75

1.154

I

1.098

3Hf =

.
=

AHf

1 133

=

6 4 72 k c a l / m G l e - '

=

2 324

.s2> =

1 215

n

Figure 7. Geometries and other properties calculated for stationary points on the UHF surface for thermolysis of 10: (a, b) the first transition state; (c, d) the intermediate. (a, c), UMIND0/3; (b, d) UMNDO. Transition vectors are indicated by arrows in the ORTEP plots for the transition states.

Table V compares the geometries calculated for 12 with ex~ e r i m e n t . The ~ ~ three sets of values agree well. Table VI shows its other calculated properties. No experimental value of AHH, for 12 has been reported, but one can be estimated from the known heats of f ~ r m a t i o n of ' ~ cyclopentene (13), cyclopentanone (14), and cyclopentane (15), on the reasonable assumption that the difference in AHf between 12 and 13 is the same as that between 14 and 15. The value found in this way (-19.4 kcal/mol) implies that the M I N D 0 / 3 and M N D O values are too negative by 5.7 and 7.3 kcal/mol, respectively, errors that are within their limits of accuracy. Indeed, both methods give energies for compounds containing fivemembered rings that are systematically too negative by about this a m o ~ n t . Note ~ ~ ' ~that the M I N D 0 / 3 and MNDO values for 12 agree closely. This confirms the explanation given above for the discrepancies between them in the case of 1, 10, and the related transition states, supporting the suggestion that the M N D O values there are to be preferred. Carbon monoxide is, unfortunately, a "bad" molecule for both (30) Dolbier, D. R.; Frey, H. M. J . Chem. SOC.,Perkin Trans 2 1974, 14, 1674. (31) Lewis, J. D.; Laane, J . J . Mol. Spectrosc. 1974, 53, 417.

Table V. Calculated and Observed Geometries of 4-Cyclopentenone (12) bond length (A) or angle (deg)

c, 0.5 c,c, c;c; C,C, C,H, C;H, C5Cl cz ClC*C, C2C3C.4 H,C,H, C,C,H,,

MNDO

MINDOI3

expt131

1.220 1.543 1.512 1.350 1.110 1.080 108.70 103.13 112.52 107.38 126.79

1.201 1.534 1.504 1.348 1.115 1.101 107.39 104.35 111.96 103.45 126.83

1.210 f 0.002 1.524 t 0.008 1.509 i 0.008 1.338 i 0.004 1.086 t 0.004 1.079 t 0.003 109.20 ? 1.0 103.13 t 0.8 11 2.43 i 0.3 107.30 i 0.67 124.70 i 0.27

M I N D 0 / 3 and MNDO, the errors in the calculated AHf being +12.9 and +20.2 kcal/mol, respectively. Better estimates of the heats of reaction for 12 (2 + CO) can therefore be obtained by taking the experimental values of AHf for C O rather than the calculated ones. Values of AH found in this way from the

-

7158 J . Am. Chem. SOC..Vol. 105, No. 24, 1983

Dewar and Chantranupong Table VL Properties Calculated for 4-Cyclopentenone (12)

c,

formal charges (e) IO

II

c2

c3 0 H, H;

12

AH+(kcalimol)

13

14

15

0.21 0.02 0.10

-0.27 0.04 0.08 -26.7 10.17 2.49

Table VII. Activation Parameters for Thermolysis of 4-Cyclopentenone (12) AE*

0

0.54 0.04 0.02 -0.48 0.01 0.02 -25.1 9.54 2.96

AS

method

(kcal/mol)

MNDO MINDOI3 expt130

54.39 51.74 51.25 * 0.2

*

(eu)

log A

6.47

14.72

2.78

13.90

5.62 * 0.32

14.52 t 0.07

17

16

M I N D 0 / 3 and M N D O AHf‘s for 12 and 2 a i s as follows: M I N D 0 / 3 , 30.6; MNDO, 29.2; “experiment”, 19.0 kcal/mol (4) The “experiment” value is derived from the above estimate of AHf for 12 together with experimental values for 2 and CO. The values of AH, given by using theoretical values of AHf throughout, are 43.5 and 49.4 kcal/mol, respectively. The conversion of 12 to (2 CO) was studied in the same way as the previous reactions, taking the length of one breaking (CC) bond as the reaction coordinate. The calculations were first camed out using M I N D 0 / 3 and MNDO. Both procedures predicted the reaction to be concertedz0 but not synchronous,20taking place via a very unsymmetrical TS whose geometry and other calculated properties are shown in Figure 8. The corresponding activation energies were very large ( M I N D 0 / 3 , 69.7; MNDO, 83.3 kcal/mol) but less than those (79.6, 90.3 kcal/mol, respectively) calculated for a synchronous process by enforcing C, symmetry. As in the case of 1, the “TS” had moreover two negative force constants. The activation energies found in this way are far larger than the experimental value (51.2 kcal/molg0), again in line with the analogous reaction of 1. The calculations for 12 were therefore repeated, using U M I N D 0 / 3 and UMNDO, leading to the reaction profiles shown in Figure 9. As expected, these are similar to the ones found in the same way for thermolysis of 1 (Figure 5) and likewise predict a two-stepz0 mechanism involving a biradicaloid (16) as a stable intermediate. Here the second TS, Le., that for conversion of 16 to the products (2 CO), is predicted to be a little higher in energy than the first, but this is almost certainly due to the errors in the calculated AHf for CO. Since these errors are specific for CO itself, they should not extend to other stable species on the potential surface. They should, however, tend to raise the energies of TS for reactions leading to CO. Therefore, there seems little doubt that the first transition state, Le., that for 12 16, corresponds to the rate-determining step. The structures and other properties calculated for this TS are shown in Figure 10. Table VI1 compares the calculated and observed30 activation parameters. The agreement is satisfactory. The “experimental” value for the AHf of 12 given in eq 3, together with the value of AHf observed for the conversion of 12 to (2 + CO), lead to an estimated value of 3 1.8 kcal/mol for the activation energy of the cheletropic addition of CO to 2 to form 12. Since this is comparable with the values reported (27.5,z1 34.321 kcal/mol) for the Diels-Alder reaction between 2 and ethylene, it should be possible to observe the formation of 12 from

+

Figure 8. Geometries calculated by MIND0/3 (MNDO) for the transition state for thermolysis of 12.

37.22 27.01

+

-

Figure 9. Reaction profiles for the thermolysis of 12, calculated (a) by UMNDO; (b) by UMIND0/3.

+

CO) under suitable conditions. D. Conversion of Tricyclo[5.2.1.02~6]deca-3,8-diene-5,10-dione (17) to 8,9-Dihydroindenone (18). The last reaction considered here has also been studied experimentally, i.e., the cheletropic decarbonylation of tricyclo [ 5.2.1.02s6]deca-3,8-diene-5,lO-dione (17) to form 8,9-dihydroindenone (18). Figure 11 shows the geometries and other properties calculated for 17 by M I N D 0 / 3 and MNDO. No experimental data are available for comparison. The heats of reaction (AZf) for conversion of 17 to (18 CO), using both observed and calculated AHf for CO, are as follows,

(2

+

J . Am. Chem. Soc.. Vol. 105, No. 24, 1983 7159

MNDO Studies of Some Cheletropic Reactions

AHf

=

11

=

< s2> =

27.01 kcallmole-'

AHf =

25.95 kcallmole-'

u =

2.4007 1


2.1258 D

1.069

=

I

1.099

AH^ u

=

'Hf

9 55 kcallmole-'

= 2

2655 D

< s 2 > = 1 151

= 14

L

-

s2>

=

0 3 kcallmale-'

2 1665 I 1 245

Figure 10. Geometries and other properties calculated for stationary points on the UHF potential surface for thermolysis of 12: (a, b) the first transition state; (c, d) the intermediate. (a, c ) U M I N D 0 / 3 ; (b, d) UMNDO. Transition vectors are indicated by arrows in the ORTEP plots for the transition states Table VIII. Calculated Activation Parameters of Tricyclo [5.2.1.0236] deca-3,8-diene-5,10-dione AH+

method

(kcal mol-')

MNDO MIND013

33.85 27.99 34.5 f 0.8

exptl

AS

'

(eu)

2.64 1.0

9.8

t

2.3

log A

13.91 13.55

the latter values being given in parentheses: M I N D 0 / 3 , -13.4 (-0.5); MNDO, -6.2 (+8.2) kcal/mol ( 5 ) Since use of the experimental value for the AHf of CO is clearly better, the reaction is probably exothermic. The reaction was first studied using M I N D 0 / 3 and MNDO. Both methods predicted it to be concerted but not synchronous, taking place via a very unsymmetrical TS whose calculated structures and heats of formation are shown in Figure 12. The

18

19

CH2 'CH2 20

corresponding activation energies (MIND0/3, 39.4; MNDO, 54.0 kcal/mol) were again too large, the observed3*value being 34.5 kcal/mol.

7160 J. Am. Chem. SOC.,Vol. 105, No. 24, 1983

Dewar and Chantranupong

= 49.43 kcallmole-'

AHf

1348

=

p

4.275 D

II

I

IP *

H -tif

\

7 . 4 1 0 ev

- 9 99 kcallmole-'

1.099

\

/I 10

H

IP =

7 . 6 7 7 ev

H

Figure 12. Geometries calculated for the transition state for thermolysis of 17: (a) MIND0/3; (b) MNDO.

%

Q

1.459

Figure 11. Bond lengths (A), heats of formation (AHf), first ionization potentials ( I , ) , and dipole moments ( p ) , calculated for tricyclo[5.2.1.02~6]deca-3,8-diene-5,10-dione (17), by (a) MIND0/3; (b) MNDO.

Reinvestigation of the reaction, using U M I N D 0 / 3 and UMNDO, led to results similar to those found in the three previous cases. Both procedures predicted the conversion of 17 to (18 CO) to be a two-stepz0 process involving a biradicaloid (19) as a stable intermediate, formation of which is the rate-determining step. Figure 13 shows the structure calculated by M N D O for the corresponding TS. As in the case of 1, the TS is very unsymmetrical, corresponding to breaking of one of the relevant C-C bonds while the other remains almost intact. The calculated activation parameters are compared with experiment32in Table VIII. The agreement is satisfactory.

I

+

Conclusions

The four reactions studied here are all predicted by both M I N D 0 / 3 and M N D O to take place in a nonsynchronous manner via very unsymmetrical transition states. Similar results were obtained in an earlier M I N D 0 / 3 study2' of the Diels-Alder reaction between 2 and ethylene (20). A further point of resemblance between the reactions is that the transition states are all close to the adducts in structure, corresponding to situations where one of the relevant bonds is weakened but the other is almost intact. In the case of the Diels-Alder reaction of 2 with 20, this corre(32) Baldwin, J. E. Can. J . Chem. 1966, 44, 2051.

&I

b

"-'-

09

B

Mf = 28.05 tcal,"ole-:

u < 52,

=

3.257 D

=

ci 97

Figure 13. Geometry and other properties calculated by LJMNDO for the TS for thermolysis of 17. The transition vector is indicated by arrows on the ORTEP plot.

sponded to a mechanism which had not been previously considered, Le., a two-step or two-stage process in which the transition state for the overall cycloaddition corresponds to ring closure of an intermediate biradical-like species. It had always been assumed that any such species would undergo cyclization without activation, so that the transition state for the overall reaction would have to correspond to the formation of the intermediate from the diene and the dienophile, not to the conversion of the intermediate to the final cyclohexene. U M I N D 0 / 3 and UMNDO overestimate the stabilities of biradical-like species as a result of an overestimation of the

J . Am. Chem. SOC.1983, 105, 7161-7167

correlation energy.33 Since the error commonly amounts to k5-20 kcal/mol, the minima in the reaction profiles of Figures 3, 8, and 12 are probably not real. A similar situation arose in the case of the Diels-Alder reaction between 2 and 20, as was pointed out at the time.21 This error will naturally tend to make the transition states leading to such species too unsymmetric, but there are reasons for believing that the conclusions reached here concerning their structures are nevertheless essentially correct. In the first place, very similar structures for the TS were predicted by the usual spin-unrestricted versions of M I N D 0 / 3 and M N D O (Figures 2, 7, 11, 15) although these grossly overestimate the energies of biradical-like species. This indeed is why these methods give activation energies that are far too large. There is, moreover, no indication of any systematic errors, either in M I N D 0 / 3 or in MNDO, that might be expected to make them overestimate the energy of a symmetrical TS relative to that of an analogous unsymmetrical Both MIND0/3 and MNDO have indeed predicted symmetrical TS for several other pericyclic

reaction^.^' Secondly, the reasonable agreement between the calculated entropies of activation, both here and for the Diels-Alder reaction (33) See, e.&: Dewar, M. J. S.; McKee, M. L. Pure Appl. Chem. 1980, 52, 1432.

(34) For a refutation of claims to the contrary by Caramella et al.,35and of a much quoted ab initio study by Townshend et al.,36see ref 21. (35) Caramella, P.; Houk, K. N.; Domelsmith, L. N. J. Am. Chem. SOC. 1977, 99, 4514. (36) Townshend, R. E.; Ramunni, G.; Segal, G.; Hehre, W. J.; Salem, L. J. Am. Chem. SOC.1976, 98, 2190. (37) See, e&: Dewar, M. J. S.; Ford, G. P. J . Am. Chem. SOC.1977,99, 8343.

7161

of 2 with 20,21provide good support for the predicted TS structures. And finally, McIver’s rules3*predict all these reactions to take place via transition states that are unsymmetrical. While these rules cannot indicate the extent to which symmetry is broken in any given case, and while their application to cycloaddition reactions is not completely rigorous,39they do nevertheless provide a strong indication that such processes cannot be synchronous.20 There seems, therefore, to be a strong indication that the cheletropic reactions considered here are not synchronous processes, as had been commonly assumed because they are “allowed by the Woodward-Hoffman rules.3 On the contrary, they seem to proceed via TS which are very unsymmetrical, one of the two breaking bonds being still almost intact while the other is weak. Acknowledgment. This work was supported by the Air Force Office of Scientific Research (Grant AFOSR 79-0008) and the Robert A. Welch Foundation (Grant F-126). The calculations were carried out using a Digital Vax 11/780 computer provided by grants from the National Science Foundation (Grant CHE78-03213) and The University of Texas, and the Dual Cyber 170/750 computer at The University of Texas Computation Center. Registry No. 1, 87494-91-5; 10, 87494-92-6; 12, 930-30-3; 17, 82665-3.

(38) McIver, J. W. J . Am. Chem. SOC.1975, 97, 3632. (39) In this case the argument rests on the assumption that off-diagonal force constants are always smaller than corresponding diagonal ones. While this is certainly true for stable molecules, it might not be for transition states.

Ground States of Molecules. 63. Reverse Cheletropic Reactions in Polycyclic Systems Michael J. S. Dewar* and Lek Chantranupong’ Contribution from the Department of Chemistry, The University of Texas at Austin, Austin, Texas 78712. Received December 16, 1982. Revised Manuscript Received July 16, 1983

Abstract: MIND0/3 and MNDO calculations are reported for the reverse cheletropic decarbonylations of 7-norbornenone, 7-norbornadienone, and exo- and endo-tricyclo[4.1.0.12~5]~~t-3-en-8-one, and the reverse cheletropic denitrigenation of 1,4cyclohexadien-2,5-ylene-l,l-diazene.The first four reactions are predicted to take place in a nonsynchronous manner via very unsymmetrical transition states while the last is synchronous, or almost synchronous.

Introduction Our previous paper2 reported M I N D 0 / 3 3 and M N D 0 4 calculations for a number of reverse cheletropic reactions involving loss of CO or N2 from unsaturated five-membered rings to form derivatives of 1,3-butadiene. Here we describe similar calculations for the reverse cheletropic loss of N2 or CO from 7-norbornenone, the corresponding diazene, and various analogues containing additional structural features. Full details of the procedure used

(1) For part 60 see: Dewar, M. J. S.; Nelson, D. J. J . Org. Chem. 1982, 47, 2614.

(2) Dewar, M. J. S.; Chantranupong, L. J . Am. Chem. SOC.,preceding paper in this issue. (3) Bingham, R. C.; Dewar, M, J. S.;Lo, D. H.J . Am. Chem. SOC.1975, 97, 1285, 1294, 1302. (4) Dewar, M. J. S.; Thiel, W. J . Am. Chem. SOC.1977,99,4899,4907.

0002-7863/83/ 1505-7 161$01.50/0

were given in the previous paper2 and need not be repeated here. Results and Discussion The calculations for the individual compounds will first be considered in turn, the results being compared with experimental data when these are available. The final section discusses the collective implications of this work concerning the mechanisms of cheletropic reactions in general. A. 7-Norbornenone (1). The first reaction studied was the thermolysis of 7-norbornenone (1) to 1,3-~yclohexadiene(2) and carbon monoxide (3). Table I compares various properties calculated by M I N D 0 / 3 and MNDO for 1 with experimental values, where available. The agreement is acceptable. Since the energies calculated by MIND 0 / 3 for norbornane and norbornadiene are much too po~itive,~ whereas those from MNDO agree quite well with e ~ p e r i m e n t , ~ 0 1983 American Chemical Society